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Bulletin of the JSME
Journal of Advanced Mechanical Design, Systems, and ManufacturingVol.11, No.3, 2017
Paper No.17-00180© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Abstract
This paper reports the design of an adjustable amplitude vibration system for mechanical linear friction
welding (LFW) equipment. The system consists of two crank slider mechanisms that are connected by a phase
modulator. The amplitude of the vibration system is determined by the average displacement of the two sliders,
which can be changed by adjusting the phase difference between the two cranks. When the vibration amplitude
is zero, the vibration system stays at a fixed position called positioning point. This study analyses the cause of
the small amplitude vibrations of the system about the positioning point and improve the length of the
connecting rod to minimize these small vibrations and ensure positioning accuracy. A kinematic and kinetic
model under linear friction welding working conditions is developed based on Simulink. The simulation results
indicate that after improvement of the mechanism, the system can satisfy the large loads of mechanical LFW
equipment (40 kN frictional force) as well as the rapid amplitude adjustment capability and positioning
accuracy requirements.
Keywords : Phase modulator, Adjustable amplitude vibration system, Linear friction welding, Kinematic and
kinetic model, Simulation
1. Introduction
Linear friction welding is a solid state welding method. Welding of homogeneous or heterogeneous materials and
of components with complex welding surfaces can be performed by driving two tightly fit parts with cyclic vibrations,
which is especially suited for welding aero-engine and turbine blades. The key component of LFW equipment is the
vibration system, which may be mechanical, electro-magnetic, or hydraulic. In addition to driving the workpieces at a
certain amplitude and frequency during the welding process, the vibration system must also provide accurate
positioning when the welding is completed. The best way to attain accurate positioning is to adjust the amplitude to
zero while keeping the vibration frequency. The positional point is the vibration origin. This control method is simple,
but the amplitude of the vibration system must be adjusted during the operation process. Due to its advantages of high
load capacity and adjustable amplitude, hydraulic vibration systems are commonly used in LFW equipment, but their
shortcomings of high costs and control difficulty cause the extreme high prices of LFW equipment. While
electromagnetic vibration systems can adjust the amplitude, their low load bearing capacity cannot satisfy the
requirements of LFW. The main component of mechanical vibration systems is the crank-slider mechanism. Due to the
difficulty in adjusting the amplitude or the complexity of the amplitude adjustment mechanism, mechanical systems are
usually not suitable for use in LFW equipment. However, if a breakthrough in amplitude adjustment can be achieved,
their advantages of low cost and control simplicity could greatly reduce the cost of LFW equipment.
The basic principle of LFW is shown in Fig. 1. A normal pressure is applied to fit the two welding parts together,
and one of the parts is driven to move reciprocally along the fitting surface. Due to the high pressure and high friction,
the two parts are welded together. In practice, part 1 is usually installed on a vibration platform that can only move
reciprocally in the vibration direction, and part 2 is connected to a hydraulic cylinder that supplies the pressure. Thus,
1
Design and simulation of an adjustable amplitude vibration system for mechanical linear friction welding equipment
Yinxun LIU*, Xiaobo PENG*, Tao CHENG* and Ping FENG* *College of Mechatronics and Control Engineering, Shenzhen University
Shenzhen, 518060, China
E-mail: [email protected]
Received: 23 March 2017; Revised: 7 May 2017; Accepted 27 August 2017
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
in addition to the positive pressure, the vibrating platform also experiences a frictional force, which is proportional to
the pressure and is in the direction opposite to the movement of the vibrating platform. Because this frictional force is
usually large, it should be considered the main load of the vibration system.
This paper reports the design of an adjustable amplitude vibration system for LFW, simulates the load that is
exerted on the vibration system during the operation of the LFW equipment, and analyses the kinematics and dynamics
of the vibration system to verify the system’s feasibility.
Fig.1 Basic principle of LFW
2. Related work
There are three major types of vibration systems: mechanical, electromagnetic, and hydraulic (Guo, 2003; Wayne,
2011; Wayne, 2012). Mechanical vibration systems usually employ a crank-slider mechanism (Biechl, et al., 1998), in
which the amplitude adjustment is the most difficult issue. Xu designed an adjustable amplitude vibration system for
mechanical LFW equipment, as shown in Fig. 2, that is able to adjust the amplitude of a single crank-slider mechanism
by a complicated hydraulic device (Xu, 2007). Electromagnetic vibration systems are usually used for lower load and
high frequency conditions. Fan and Pan used an electromagnetic exciter to eliminate the whip of a rotor-bearing system
(Fan, et al., 2011), and Kim, Jeong and Han designed an electromagnetic vibration exciter for electrostatic precipitation
and verify its feasibility (Kim, 2012). Due to their high load bearing capacity and adjustable amplitude, hydraulic
vibration systems can satisfy almost all of the requirements of a vibration system (Silva, et al., 2002; Jia, et al., 2008;
Carden, 2012; Zhang, et al., 2012) and thus have been used widely. Carle introduced a hydraulic vibration exciter and
developed a method to cool the exciter (Carle, 1980). The control of an electro-hydraulic exciter is very complicated
(Olszewski, et al., 2004; Johnson, 2010; Konieczny, et al., 2013). Plummer et al. provided an effective
electro-hydraulic exciter control system (Plummer, 2007; Zhu, et al., 2010). To address the problem of the low
frequency of electro-hydraulic exciters, Ruan et al. developed a 2-D valve solution to increase the frequency of an
electro-hydraulic exciter and study its bias control strategy (Ruan, et al., 2009; Yan, et al., 2010a). Furthermore, Yan,
Jian and Ji analysed the excitation waveform of a 2-D valve electro-hydraulic exciter (Yan, et al., 2010b).
Fig. 2 The LFW equipment with a single crank-slider mechanism (Xu, 2007)
(1-Pressure cylinder; 2-Piston rod; 3-Rear bearing; 4-Sliding table; 5-Guide shaft; 6-Front bearing; 7-Weldment; 8-Fixture; 9-Weldment;
10-Vibration fixture; 11- Linear guide; 12- Rear bracket; 13-Connecting rod; 14-Roller; 15- Roller frame; 16-Piston rod; 17-Amplitude
adjusting cylinder; 18-Guide; 19-Bracket; 20- Eccentric shaft bearing; 21- Connecting rod; 22-Eccentric shaft; 23- Motor)
2
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
3. Vibration system design
Although a single crank slider can provide the required vibration for LFW with a mechanical vibration system, it is
usually difficult to achieve workpiece positioning at the completion of welding. For example:
1) If the motor is directly shut off, the workpiece may stop at any position within the range of vibration, and the
positioning cannot be achieved.
2) Due to the high load and high motor rotation speed, using a clutch to cut off the power source combined with
a position limiting method for the positioning will introduce a large shock on the relevant mechanism.
3) Due to the high load, using a motor rotation angle closed loop control method to achieve positioning places a
high demand on the motor performance.
To address these problems, this paper employs a double crank phase adjustment method that resolves the
workpiece positioning problem by adjusting the amplitude of the vibration system. While compared with the hybrid
LFW equipment shown in Fig. 2, the proposed method is simpler in structure and control and easier to implement.
3.1 Design requirements
The main demands of the LFW process on the vibration system’s performance are as follows:
1) Load bearing capacity: a frictional force of 40 kN.
2) Amplitude modulation duration: adjust the amplitude from 3 mm to zero within 1 s.
3) Positioning accuracy: 10 μm.
3.2 Overall design
Figure 3 shows the overall design of the vibration system. Two identical crank slider mechanisms are driven by an
AC motor (1), and the crank-slider mechanism is composed of a crank (8), connecting rod (2), and slider (3). The two
sliders (3) are located at both ends of the beam (7) and slide along with the beam (7), and the vibration platform (5) can
slide up and down along the linear track (6). The vibration platform (5) is hinged at the midpoint of the beam (7), and
the displacement is the average displacement of the two sliders (3). The linear track (4) under the sliders (3) are fixed
symmetrically on both sides of the linear track (6). The two cranks (8) are coaxially connected through the phase
modulator (9); they have the same rotation speed, and the phase differences can be changed by the phase modulator (9).
When the phase difference is 0, the two sliders (3) have the same displacement, and the vibration platform (5) has the
largest amplitude. As the phase difference changes from 0 to 180°, the amplitude of the vibration platform (5) decreases
gradually. When the phase difference is 180°, the displacement of the two sliders (3) are the same but in the opposite
direction, and the amplitude of the vibration platform (5) is the smallest. At this time, the LFW process is completed,
and the workpiece is positioned.
Fig. 3 Overall design of the vibration system
(1-AC motor; 2-Connecting rod; 3-Slider; 4-Linear track; 5-Vibration platform; 6-Linear track; 7-Beam; 8-Crank; 9-Phase modulator)
3
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
3.3 Phase modulator design
The phase modulator is the key mechanism of the proposed vibration system; it can change the phase difference
between the two cranks during operation of the vibration system and ensures that the two cranks have the same rotation
speed before and after the phase modulation. Figure 4 shows the motion of the phase modulator. The planetary gear
mechanism is composed of the input shaft (a), the planetary gear (b), the carrier (c), and the output shaft (d), and each
bevel gear has the same number of teeth. The worm wheel (e) is fixed to the carrier (c), and the worm shaft (d) is fixed
to the phase modulator frame. The worm shaft (d) is driven by a stepping motor and rotates the worm wheel (e) and the
carrier (c). The lead angle of the worm shaft (d) is less than 4 ° to achieve self-locking of the worm gear. For the
planetary gear mechanism that is an epicyclic gear train,
c
c a a c f
af c
f c af
1z
iz
(1)
where i is the transmission ratio of the gear, z is the number of teeth of the gear, and superscript ‘c’ means that the
carrier (c) is treated as the reference frame of the epicyclic gear train.
The output shaft rotation speed can be obtained as
f a c( 2 ) (2)
When the planet carrier is stationary (i.e., ωc = 0 and ωf = -ωa), the input and output shafts have the same speed but
rotate in opposite directions. When the worm shaft is driving the worm wheel and the carrier (i.e., ωc ≠ 0), the rotation
angle of the output shaft at any time t is
f f a c a c a c0 0 0 0
d ( 2 )d ( d 2 d ) ( 2 )t t t t
t t t t (3)
Thus, the leading (or lagging) angle of θf relative to θa is 2θc; i.e., for every 1° of rotation of the worm wheel that is
driven by the shaft, the phase difference between the two crank slider mechanisms is 2°.
Fig. 4 Kinematic diagram of phase modulator
(a-Input shaft; b-Planetary wheel; c-Planet carrier; d-Worm shaft; e-Worm wheel; f-Output shaft)
As shown in Fig. 5, the carrier that is indirectly driven by the stepping motor is affected by the force of the internal
gear during the phase modulating process; thus, the driving requirement of the phase modulator needs to be determined
to select the suitable stepping motor. The rotation speed of the designed input shaft is na = 3000 rpm, the number of
threads of worm shaft is zd = 1, the number of teeth of the worm gear is ze = 50, and the worm gear’s transmission
efficiency is = 0.7. Assuming that the torque of the input shaft (a) Ta is half of the AC motor’s load torque TL, then
a L0.5T T (4)
On the carrier,
a
c at ft(2 2 )2
dT F F (5)
4
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
where
a
a at22
dT F (6)
a
f ft22
dT F (7)
Ignoring the friction force between the gears and rotating pairs,
a fT T (8)
From Eq. (4) to Eq. (8),
c LT T (9)
Thus, the load torque of the worm shaft (i.e., stepping motor) is
c
d L
e
d
1
50 350.7
1
LT T
T Tz
z
(10)
a
b
c
d
ef
O
Fat Tc
Fft
Fat
Fft
TaTf
da
Fig. 5 Force diagram of phase modulator (left) and planet carrier (right)
Because the amplitude of the vibration system must be modulated from 3 mm to 0 mm within 1 s (i.e., the phase
modulator needs to make a phase difference of 180° within 1s), the worm wheel rotates 90° within 1s, and the stepping
motor should complete a rotation of 25π (i.e. 50×π/2) radians in 1 s. An S shape output curve shown in Fig. 6 is applied
to the angle control of the stepping motor so that a good dynamic performance is obtained. The expression of the S
shape curve is
5 5
d 5 5 10( 0.5)
1 e 1 e=25π 1
e e 1 e t
(11)
where θd is the rotation angle of the stepping motor, t is the time. So
2
d d
d 2
d d= =
d dt t
(12)
where ωd and αd are the angular velocity and angular acceleration of the stepping motor. According to Eq.(11) and (12),
the maximum angular velocity and maximum angular acceleration of the stepping motor are ωdmax = 199 rad/s and αdmax
= 766 rad/s2.
The relationship between the output torque of the stepping motor Ts, Td and αd is
s d se dT T J (13)
where Jse is the equivalent moment of inertia of each moving element driven by the stepping motor relative to the
stepping motor shaft,
5
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
2 2 2 2e bf f
se d bce f b csv
d d d d
( ) ( ) 2 ( ) ( )J J J J J J
(14)
The meanings and values of the variables in Eq.(14) are obtained from the 3D models and shown in Table (1).
Considering that ωa, the rotation speed of (a) in Fig.4, keeps unchanged during the phase modulation and the stepping
motor only contributes to the increments of rotation speeds and driving torques of b, c, d, e and f, which are
independent of ωa, ωa is assumed to be 0 to simplify the calculation of the output torque of the stepping motor. In this
case, ωe/ωd = 1/50, being equal to the transmission ratio between the worm shaft and worm wheel. As ωc = ωe and ωf =
2ωc from Eq.(2), ωf/ωd = 1/25. As shown in Fig. 4, when ωa is 0, the velocity of the center of (b) vbo equals ωbr, and
also equals ωcr, where r is the pitch radius of the bevel gears (a) and (b). Thus, ωb = ωc, that is ωb/ωd =1/50.
The maximum rotational speed of the stepping motor is:
d max
max
19960 rpm 60 rpm 1900rpm
2π 2πn
(15)
0 0.2 0.4 0.6 0.8 10
20
40
60
80
t(s)
θ4(r
ad
)
25π
d
Fig. 6 The S shape output curve of the stepping motor
Table 1 Moment of inertia
Parameter name Symbol Value Unit
Moment of inertia of worm shaft Jd 1.95×10-4
kg·m2
Total moment of inertia of planetary gear
revolution, carrier and worm wheel Jbce 2.36×10
-2 kg·m
2
Moment of inertia of output shaft Jf 2.16×10-2
kg·m2
Moment of inertia of planetary gear rotation Jb 1.66×10-4
kg·m2
Equivalent moment of inertia of connecting
rod, slider, beam and vibration platform
relative to the crank
Jcsv Refer to
Eq.(32) kg·m
2
4. Kinematic analysis of the vibration system
The vibration system is mainly composed of two crank-slider mechanisms, a phase modulator, a beam, and a
vibration platform. Because the phase modualtor is used to change the phase difference between the two crank-slider
mechanisms, it can be excluded from the kinematic and dynamic analysis. The kinematic diagram of the vibration
system is shown in Fig. 7.
6
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
1
2
36
4
5
7
θ1ω1
l1
l2
l4
θ4
ω4
l5
θ5ω5
v7
s7
v6
s6v3
s3
θ2ω2
Fig. 7 Kinematic diagram of the vibration system
According to the design conditions, θ4=θ1+φ, ω4=ω1, l4=l1, and l5=l2 and for the crank slider mechanism 1-2-3,
1
2 1 1
2
sin sin sinl
l (16)
2 1
2 1
2
d cos
d cost
(17)
3 1 1 2 2(1 cos ) (1 cos )s l l (18)
3 1 1 1 2
3
2
d sin( )
d cos
s lv
t
(19)
Similarly, for the slider-crank mechanism 4-5-6,
5 4sin sin (20)
4
5 4
5
cos
cos
(21)
6 1 4 2 5(1 cos ) (1 cos )s l l (22)
6 4 1 4 5
6
5
d sin( )
d cos
s lv
t
(23)
For the center of the beam,
7 3 6 1 1 4 2 2 5
1 1( ) (2 cos cos ) (2 cos cos )
2 2s s s l l (24)
7 3 6
1( )
2v v v (25)
7
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
5. Kinetic analysis of the vibration system
5.1 Power balance equation
Because the two crank-slider mechanisms mainly work against the friction exerted by the LFW, based on the power
balance principle, the power of the AC motor is equal to the power that is consumed to overcome the frictional force:
TLω1=|fv7| (26)
5.2 Equivalent moment of inertia
Because the AC motor drives the double crank-slider mechanisms to operate at a high rotational speed, the moment
of inertia of each rotating component has a significant influence on the motor shaft and the motor operation state, and it
is necessary to analyse the moment of inertia of the moving parts. The method of the equivalent moment of inertia is
used for convenience. The moment of inertia of each moving element is equivalent to that of the motor shaft; the
expression is:
n mS2 2
e S
1 11 1
( ) ( )j
i
i
j
i j
vJ J m
(27)
That is,
2 2 2 2 2 2 25 5 3 6 72 2
e 1 2 5 2 5 3 6 7
1 1 1 1 1 1 1
( ) ( ) ( ) ( ) ( ) ( ) ( )v v v vv
J J J J m m m m m
(28)
Considering the connection rod 2, the velocity of its centroid is equal to the vector sum of the velocity of its big end,
which is l1ω1, and the relative velocity between the centroid and the big end, which is lcω2 where lc is the distance
between the centroid and the big end. Calculated by the 3D model of the rod, lc is 2/5 of the rod length l2, so
2 2 2
2 1 1 1 2 2 2 1 1 1 2 2 2
2 2( cos cos ) ( sin sin )
5 5v l l l l
2 2 2 2
1 1 2 2 1 2 1 2 1 2
4 4cos( )
25 5l l l l (29)
Similarly
2 2 2 2 2
5 1 1 2 5 1 2 1 5 4 5
4 4cos( )
25 5v l l l l (30)
The relationship between TL, Je and the electromagnetic torque of the AC motor Te can be written as
1
e L e
d
dT T J
t
(31)
With Eq. (20), (21), (23), (25) and (30), Jcsv in Eq.(14) can be obtained by Jcsv=J5(ω5/ω4)2+ m5(v5/ω4)
2+ m6(v6/ω4)
2+
m7(v7/ω4)2. Its maximum value is used for the design in the paper
2 2 2 21
csvmax 5 5 1 6 1 7 1
2
64 1( )
25 2
lJ J m l m l m l
l (32)
8
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
6. Simulink-based modeling and simulation
6.1 Simulink-based modeling
The dynamic simulation model of the vibration system is developed in Simulink as shown in Fig. 8 to Fig. 10,
where the expressions of all the Function Blocks f(u) can be obtain from Eq. (16) to Eq. (31). The system is mainly
composed of a general three-phase asynchronous AC motor model with Ua, Ub, Uc being the three-phrase input voltages,
a kinematic model, and a kinetic model. The parameters of the vibration system obtained from its 3D model and the
parameters of the AC motor (Huang, et al., 2013) are listed in Tables (2) and (3), respectively.
Fig. 8 Dynamic simulation model of the vibration system
Fig. 9 Kinematic model
9
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
Fig. 10 Kinetic model
Table 2 Vibration system parameters
Parameter name Symbol Value Unit
Total inertia of the crank and motor shaft J1 0.227 kg·m2
Inertia of connecting rod J2, J5 0.068 kg·m2
Mass of connecting rod m2, m5 10 kg
Slider mass m3, m6 10 kg
Total mass of the beam and vibration platform m7 110 kg
Crank eccentricity l1, l4 0.003 m
Length of connecting rod l2, l5 0.25 m
Friction force f 40 kN
Table 3 Three-phase asynchronous AC motor parameters
Parameter name Symbol Value Unit
Rated power PN 37 kW
Rated voltage UN 380 V
Rated frequency fN 50 Hz
Stator winding resistance Rs 0.08233 Ω
Rotor winding resistance Rr 0.0503 Ω
Stator winding self-inductance Ls 27.834 mH
Rotor winding self-inductance Lr 27.834 mH
Stator-rotor mutual inductance Lm 27.11 mH
Pole pairs np 1 -
6.2 Analysis of Simulation Results
The two most important parameters of the proposed vibration system are the amplitude and frequency. The
amplitude A can be obtained from the vibration platform’s displacement s7:
7 max 7 min
1( )
2A s s (33)
The frequency f can be obtained by the motor speed ω:
2f
(34)
10
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
The initial phase difference is set to be φ = 0°. When t1 = 1.5 s, the phase difference is set to be φ = 180° in 1 s.
Figure 11(a) and Fig. 11(b) show the simulation results, where ts is the starting time of the AC motor.
1) When the phase difference φ = 0°, ω = 312.25 rad/s, s7max = 6 mm, and s7min = 0. From Eq. (33) and Eq. (34), f
= 49.69 Hz, and A = 3 mm.
2) When the phase difference φ = 180°, ω = 314.11 rad/s. As shown in Fig. 11(c), s7max = 3 mm, and s7min = 2.982
mm. From Eq. (33) and Eq. (34), f = 49.99 Hz, and A = 0.009 mm.
0 0.5 1 1.5 2 2.5 3 3.50
50
100
150
200
250
300
350
t(s)
(
rad
/s)
t1ts
(a) Curve of the motor speed ω versus time t
0 0.5 1 1.5 2 2.5 3 3.5
0
2
4
6
t(s)
s 7(m
m)
t1
(b) Curve of the vibration platform’s displacement s7 versus time t
2.5 3 3.52.98
2.985
2.99
2.995
3
t(s)
s 7(m
m)
(c) Local enlarged drawing of (b) from t = 2.5 s to t = 3.5s
Fig. 11 Simulation results
11
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
6.3 Error analysis and improvement
When the phase difference φ = 180°, the vibration platform should be stationary at the origin, which corresponds to
the position at the completion of the LFW process. However, the simulation results show that the vibration platform is
still vibrating with a fixed amplitude of A = 0.009 mm at this time. This amplitude has a significant impact on the
positioning accuracy at the completion of the LFW process and thus needs to be improved.
6.3.1 Impact of the fitting gap on the vibration system
As shown in Fig. 3, the vibration platform (5) is connected to the midpoint of the beam (7) through a hinge
connection; the fitting method is a shaft-hole clearance fit (H8 / g7). Considering the impact of this gap on the vibration
platform, s7 is actually the displacement of the beam’s centre. As shown in Fig. 12, when the phase difference φ = 180°,
the maximum vibration displacement of the beam’s centre Δh only needs to be less than the minimum gap Xmin; thus,
this vibration can be cancelled by the fitting gap and does not affect the positioning accuracy of the vibration system.
The basic dimension of the gap fitting is 25 mm. Using a look-up table, we obtain EI = 0 and es = -7 μm; that is
When the phase difference φ = 180°, the movement of the vibration system can be simplified as shown in Fig. 13.
When the crank rotation angle is α degrees (i.e., θ1 = 180°+α, θ4 = α), Eq. (16) and Eq. (20) show that
5 2 (36)
Let l4 = l1 = r = 3 mm, l5 = l2 = l; then
A cos cosh l r (37)
B cos cosh l r (38)
The height of the beam centre at this time is
A B
1( ) cos
2h h h l (39)
Because
min 0
max2 2
arccosl
l r
(40)
12
min EI es 7μmX (35)
Δh Xmin
Shaft
Hole
Fig. 12 The relationship between Δh and Xmin in the shaft-hole clearance fit
6.3.2 Error analysis and optimization considering the fitting gap
2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
the maximum displacement of the midpoint of the beam’s centre is
2
min max max2 2
( ) ( ) (1 cos )l
h h h l ll r
(41)
The variation of Δh with respect to l can be obtained from Eq. (41) and is shown in Fig. 14. When l > 2.4 mm, Δh
decreases with increasing l; As the length of connecting rod is larger than 2.4mm(also larger than 3mm, the eccentricity
of the cranks), increasing l can reduce the maximum displacement of the beam’s centre. When Δh = Xmin, l = 643 mm;
that is, when l > 643 mm, the vibration of the beam’s centre will be cancelled by the fitting gap, and the positioning
accuracy of the vibration system will not be affected by the vibration. To increase the reliability, the design uses l =
1000 mm; at this length, Δh = 4.5 μm, and the length of connecting rod l is within the acceptable range. The improved
parameters are shown in Table (4).
Fig. 13 Vibration system analysis diagram when φ = 180°
0 200 400 600 800 1000 12000
0.2
0.4
0.6
0.8
1
X: 2.4
Y: 0.9007
l2(mm)
h
(m
m)
Fig. 14 Variation of the maximum vibration platform displacement with the length of connecting rod when φ = 180°
Table 4 Adjusted parameters after improvement
Parameter name Symbol Value Unit
Length of connecting rod l2, l5 1 m
Mass of connecting rod m2, m5 50 kg
Inertia of connecting rod J2, J5 2.221 kg·m2
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2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
6.3.3 Analysis of simulation results after improvement
The simulation conditions are kept the same as before, and the results are shown in Fig. 15(a) and Fig. 15(b). The
results show that:
1) When the phase difference φ = 0°, ω = 312.25 rad/s, s7max = 6 mm, and s7min = 0. From Eq. (33) and Eq. (34), f
= 49.69 Hz, and A = 3 mm.
2) When the phase difference φ = 180°, ω = 314.13 rad/s. Figure 15(c) shows that s7max = 3 mm, and s7min =
2.9955 mm. Eq. (33) and Eq. (34), f = 49.995 Hz, and A = 2.25 m.
3) As shown in Fig. 15(d), when the phase difference φ = 0°, the AC motor load torque TL reaches its maximum
of 120 N·m. Eq. (10), (13), (14) and (32) and Table (1), (2) and (4) show that the required output torque of the
stepping motor Ts = 3.61 N·m.
These simulation results show that the amplitude of the vibration platform changes with the variation in the phase
difference; it reaches a maximum when =0° and has a value of 0 when = 180°. The workpiece is well positioned
(the vibration amplitude of the beam centre at this time is 2.25 μm, but it is cancelled by the fitting gap and thus does
not affect the positioning accuracy). Moreover, the AC motor can drive the vibration system to vibrate at a frequency of
approximately 50 Hz, which satisfies the requirement of the LFW process and thus is considered to be stable.
To enable the phase modulation, an output torque of 3.61 N·m and a rotation speed of 1900 rpm are required for
the stepping motor, which is satisfied by 86J1895EC, the stepping motor we use.
0 0.5 1 1.5 2 2.5 3 3.50
50
100
150
200
250
300
350
t(s)
(
rad
/s)
ts t1
(a) Curve of the motor speed ω versus time t
0 0.5 1 1.5 2 2.5 3 3.5
0
2
4
6
t(s)
s 7(m
m)
t1
(b) Curve of the vibration platform’s displacement s7 versus time t
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2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
2.5 3 3.5
2.996
2.998
3
t(s)
s 7(m
m)
(c) Local enlarged drawing of (b) from t = 2.5 s to t = 3.5s
0 0.5 1 1.5 2 2.5 3 3.50
50
100
150
t(s)
TL
(N·m
)
(d) Curve of the AC motor load torque TL versus time t
Fig. 15 Simulation results after improvement
7. Conclusions
This study designed an adjustable amplitude vibration system for LFW equipment. Amplitude adjustment of the
vibration system was achieved by utilizing a phase modulator to alter the phase difference between two crank-slider
mechanisms. This study analysed the working principle of the phase modulator, developed kinematic and kinetic
models for the vibration system, and utilized Simulink to simulate the vibration system. The following conclusions
were obtained:
1) The phase difference between the two crank-slider mechanisms can be modulated using a stepping motor
driving worm and worm wheel mechanism, and the worm wheel mechanism can self-lock.
2) Under a frictional force of 40 kN, the AC motor can drive the vibration system to vibrate at a stable frequency
of approximately 50 Hz, which satisfies the demands of common LFW processes.
3) The amplitude of the vibration platform changes with the phase variation. The amplitude reaches a maximum
of 3 mm when the phase difference is φ = 0°. When the phase difference is φ = 180°, the vibration platform
has vibrates at a small amplitude, but the amplitude can be reduced by increasing the length of the connecting
rod in the crank-slider mechanism. When the connecting rod is longer than 643 mm, this small vibration
amplitude has no effect on the positioning accuracy of the vibration system.
4) The working conditions of the system are satisfied by this system.
Acknowledgement
This work was supported by Public Welfare Research and Capacity Building Project of Guangdong Province,
China (2014A010103034) and the National Natural Science Foundation of China (11274336). The authors would like
to sincerely acknowledge all the support.
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2© 2017 The Japan Society of Mechanical Engineers[DOI: 10.1299/jamdsm.2017jamdsm0038]
Liu, Peng, Cheng and Feng, Journal of Advanced Mechanical Design, Systems, and Manufacturing, Vol.11, No.3 (2017)
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